Weyl invariant $E_8$ Jacobi forms

IF 1.2 3区 数学 Q1 MATHEMATICS
Haowu Wang
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引用次数: 9

Abstract

We investigate $W(E_8)$-invariant Jacobi forms which are the Jacobi forms invariant under the action of the Weyl group of the root system $E_8$. This type of Jacobi forms has applications in mathematics and physics, but very little has been known about its structure. In this paper we show that the bigraded ring of weak $W(E_8)$-invariant Jacobi forms is not a polynomial algebra over $C$ and prove that every $W(E_8)$-invariant Jacobi form can be expressed uniquely as a polynomial in nine algebraically independent holomorphic Jacobi forms introduced by Sakai with coefficients which are meromorphic $SL_2(Z)$ modular forms. The latter result implies that the graded ring of weak $W(E_8)$-invariant Jacobi forms of fixed index is a free module over the ring of $SL_2(Z)$ modular forms and the number of generators can be calculated by a generating series. We also determine and construct all generators of small index. These results extend Wirthm\"{u}ller's theorem proved in 1992 to the last open case.
Weyl不变$E_8$ Jacobi形式
研究了$W(E_8)$-不变Jacobi型,它们是根系统$E_8$的Weyl群作用下的Jacobi型不变量。这种类型的雅可比形式在数学和物理中有应用,但对其结构知之甚少。本文证明了弱$W(E_8)$不变Jacobi形式的重变换环不是$C$上的多项式代数,并证明了每$W(E_8)$不变Jacobi形式在Sakai引入的系数为亚纯$SL_2(Z)$模形式的9个代数独立的全纯Jacobi形式中都可以唯一地表示为多项式。后一个结果表明,固定指标的弱$W(E_8)$不变Jacobi形式的梯度环是$SL_2(Z)$模形式环上的自由模,生成子的个数可以用生成级数来计算。我们还确定并构造了所有小索引的生成器。这些结果将1992年证明的Wirthm\ {u}ller定理推广到最后一个开放情况。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Communications in Number Theory and Physics
Communications in Number Theory and Physics MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
2.70
自引率
5.30%
发文量
8
审稿时长
>12 weeks
期刊介绍: Focused on the applications of number theory in the broadest sense to theoretical physics. Offers a forum for communication among researchers in number theory and theoretical physics by publishing primarily research, review, and expository articles regarding the relationship and dynamics between the two fields.
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